Y.M. Cho scite author profile

We present a new type of spherically symmetric monopole and dyon solutions with the magnetic charge 4π/e in the standard Weinberg-Salam model. The monopole (and dyon) could be interpreted as a non-trivial hybrid between the abelian Dirac monopole and non-abelian 't Hooft-Polyakov monopole (with an electric charge). We discuss the possible physical implications of the electroweak dyon.Typeset using REVT E X 1

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Gravitation as gauge theory of the diffeomorphism group

Cho

Soh

Yoon

et al. 1992

Physics Letters B

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Fermionic vortex solutions in Chern-Simons electrodynamics

1992

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We present anyonic vortex solutions made of real electrons which could be interpreted as nontopological solitons of the (2 + 1)-dimensional Chern-Simons electrodynamics. The n-soliton solutions, which we obtain by imposing an effective axial symmetry on the (3+ 1)-dimensional quantum electrodynamics, have 4n real parameters which represent the position, size, and phase of each soliton.PACS number(s): 11.15. -q, 03.50.Kk, 12.20.Ds, 74.65. +n The axially symmetric vortex solutions which exist in ( 3 + 1 )-dimensional gauge theories have played a very important role in physics. They describe the quantized magnetic flux lines in superconductivity [I], the string model in hadrodynamics [2], and the large-scale cosmic strings in cosmology [3]. Similar vortex solutions also exist in the ( 2 + 1 )-dimensional Chern-Simons gauge theory[4]. In all these solutions, however, the presence of scalar fields has played a crucial role in providing the source of the vortices. So far no vortex solution made of a fermionic source has been constructed, although the fermionic bound states coupled to an arbitrary external magnetic vortex have been discussed by many authors [5]. The purpose of this paper is to show the existence of axially symmetric vortex solutions in which a fermion field provides the source of the vortices, and to discuss the physical implication of the solutions.The system we discuss is the one derived from the (3+ 1)-dimensional quantum electrodynamics which has an effective axial symmetry described in the following. With the symmetry one can reduce the theory to the ( 2 + 1 )-dimensional Maxwell electrodynamics which has two interacting fermionic sources: the right-handed and the left-handed fermions. Furthermore, when the effective axial symmetry is chosen in such a way to violate parity, one may add the Chern-Simons interaction to the theory. This is because the Chern-Simons interaction could be induced by the higher-order quantum correction of the fermions when a parity-violating interaction is present [ 6 ] . In this case the theory becomes Maxwell-Chern-Simons electrodynamics, but again with two fermionic sources. This means that, in the longdistance limit in which the Chern-Simons term dominates the Maxwell term, the theory can be approximated to an effective Chern-Simons electrodynamics. In this limit we show that the theory admits vortex solutions made offermions.Let us start with ( 3 + 1 )-dimensional quantum electrodynamics. In the chiral representation in which y 5 becomes diagonal one can describe the Dirac spinor \V with two two-components spinors where \V+ and \V-are the right-handed and the lefthanded Weyl spinors. Now we impose the effective axial symmetry 2nd assume that the Weyl spinors \ V, are periodic in the z coordinate (with different periodicities), but the gauge potential is independent of the z coordinate. With this effective axial symmetry one can easily reduce the theory to ( 2 + 1 )-dimensional electrodynamics.After the dimensional reduction by integrating out the z dependence, we o...

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Dirac Quantization of Restricted QCD

et al. 2007

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Y.M. Cho

Monopole configuration in Weinberg-Salam model

Gravitation as gauge theory of the diffeomorphism group

Fermionic vortex solutions in Chern-Simons electrodynamics

Dirac Quantization of Restricted QCD

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